On Schrödinger Groups of Operators Satisfying Sub-Gaussian Estimates
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Publication:6497004
DOI10.1007/S12220-024-01626-5MaRDI QIDQ6497004
Publication date: 6 May 2024
Published in: The Journal of Geometric Analysis (Search for Journal in Brave)
One-parameter semigroups and linear evolution equations (47D06) Schrödinger operator, Schrödinger equation (35J10) (H^p)-spaces (42B30) Harmonic analysis and PDEs (42B37)
Cites Work
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- Sharp \(L^p\) bounds for the wave equation on groups of Heisenberg type
- \(L^p\)-estimates for the wave equation on the Heisenberg group
- \(L^p\) estimates for the waves equation
- Riesz transform, Gaussian bounds and the method of wave equation
- Riesz transform for \(1\leq p \leq 2\) without Gaussian heat kernel bound
- Sharp \(L^p\) estimates for Schrödinger groups on spaces of homogeneous type
- Sharp endpoint \(L^p\) estimates for Schrödinger groups
- Imaginary powers of Laplace operators
- Extensions of Hardy spaces and their use in analysis
- HARDY SPACES ON METRIC MEASURE SPACES WITH GENERALIZED SUB-GAUSSIAN HEAT KERNEL ESTIMATES
- Gaussian heat kernel upper bounds via the Phragmén-Lindelöf theorem
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